x=x′cos theta−y′sin theta y=x′sin theta+y′cos theta (del f)/(del x′)=(del f)/(del x) cos theta+(del f)/( del y) sin theta are given. How the partial derivative with respect to x′ is obtained.

Siemensueqw

Siemensueqw

Answered question

2022-11-17

x = x cos θ y sin θ y = x sin θ + y cos θ
f x = f x cos θ + f y sin θ
are given. I don't understand how the partial derivative with respect to x′ is obtained. Can you explain?
2 f x 2 = 2 f x 2 cos 2 θ + x ( f y ) sin θ cos θ + y ( f x ) cos θ sin θ + 2 f y 2 sin 2 θ

Answer & Explanation

merlatas497

merlatas497

Beginner2022-11-18Added 14 answers

You have
{ x = x cos θ y sin θ y = x sin θ + y sin θ { x x = cos θ y x = sin θ
so that you can apply the chain rule to get
f x = f x x x + f y y x = f x cos θ + f y sin θ .

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